Abstract
In this paper, we introduce a robust estimator of the tail index of a Pareto-type distribution. The estimator is obtained through the use of the minimum density power divergence with an exponential regression model for log-spacings of top order statistics. The proposed estimator is compared to existing minimum density power divergence estimators of the tail index based on fitting an extended Pareto distribution and exponential regression model on log-ratio of spacings of order statistics. We derive the influence function and gross error sensitivity of the proposed estimator of the tail index to study its robustness properties. In addition, a simulation study is conducted to assess the performance of the estimators under different contaminated samples from different distributions. The results show that our proposed estimator of the tail index has better mean square errors and is less sensitive to an increase in the number of top order statistics. In addition, the estimation of the exponential regression model yields estimates of second-order parameters that can be used for estimation of extreme events such as quantiles and exceedance probabilities. The proposed estimator is illustrated with practical datasets on insurance claims and calcium content in soil samples.
Highlights
Extreme value theory (EVT) has become an important tool in many disciplines for the estimation of rare events that are related to environmental science, hydrology, insurance and finance, among others
We propose a robust estimator for tail index of Pareto-type using the minimum density power divergence (MDPD) idea on an exponential regression model
The estimation of γ remains an important research area in EVT. Another approach to obtaining the tail index relies on the Balkema and de Haan (1974) and Pickands III (1975) theorem, which states that the distribution is in the max-domain of attraction of the generalised extreme value (GEV) distribution if and only if the distribution of excesses over high thresholds is asymptotically the generalised Pareto (GPD)
Summary
Extreme value theory (EVT) has become an important tool in many disciplines for the estimation of rare events that are related to environmental science, hydrology, insurance and finance, among others. Juarez and Schucany (2004) seem to be first authors to employ the minimum density power divergence (MDPD) of Basu et al (1998) for the robust estimation of parameters of an extreme value distribution. Ghosh (2017) proposed a robust MDPD estimator for real-valued tail index This estimator is a robust generalisation of the estimator proposed by Matthys and Beirlant (2003) and the author addresses the non-identical distributions of the exponential regression model using the approach in Ghosh and Basu (2013). We propose a robust estimator for tail index of Pareto-type using the MDPD idea on an exponential regression model.
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